Quasi-linear Stokes phenomenon for the Painlev\'e first equation

Abstract

Using the Riemann-Hilbert approach, the -function corresponding to the solution of the first Painleve equation, yxx=6y2+x, with the asymptotic behavior y-x/6 as |x|∞ is constructed. The exponentially small jump in the dominant solution and the coefficient asymptotics in the power-like expansion to the latter are found.

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